A Blahut-Arimoto Type Algorithm for Computing Classical-Quantum Channel Capacity

Abstract

Based on Arimoto's work in 1978, we propose an iterative algorithm for computing the capacity of a discrete memoryless classical-quantum channel with a finite input alphabet and a finite dimensional output, which we call the Blahut-Arimoto algorithm for classical-quantum channel, and an input cost constraint is considered. We show that to reach accuracy, the iteration complexity of the algorithm is up bounded by n where n is the size of the input alphabet. In particular, when the output state \x\x∈ X is linearly independent in complex matrix space, the algorithm has a geometric convergence. We also show that the algorithm reaches an accurate solution with a complexity of O(m3 n), and O(m3(1-δ)D(p*||pN0)) in the special case, where m is the output dimension and D(p*||pN0) is the relative entropy of two distributions and δ is a positive number.